The notion of fascism is not unlike Wittgenstein’s notion of a game. A game can be either competitive or not, it can require some special skill or none, it can or cannot involve money. Games are different activities that display only some “family resemblance,” as Wittgenstein put it. Consider the following sequence:

1 2 3 4

abc bcd cde def

Suppose there is a series of political groups in which group one is characterized by the features abc, group two by the features bcd, and so on. Group two is similar to group one since they have two features in common; for the same reasons three is similar to two and four is similar to three. Notice that three is also similar to one (they have in common the feature c). The most curious case is presented by four, obviously similar to three and two, but with no feature in common with one. However, owing to the uninterrupted series of decreasing similarities between one and four, there remains, by a sort of illusory transitivity, a family resemblance between four and one.

This is a point that can be made about fascism, apples, cats, philosophers, or anything else in our world. I typically use apples to explain this idea of Wittgenstein, and was pleasantly surprised to find Eco using it to understand fascism, as I am teaching Wittgenstein for Intro Philosophy this week, and fascism for Social & Political Philosophy next semester.